时空点模式密度估计的非参数惩罚似然法

IF 2.1 2区 数学 Q3 GEOSCIENCES, MULTIDISCIPLINARY Spatial Statistics Pub Date : 2024-04-18 DOI:10.1016/j.spasta.2024.100824
Blerta Begu , Simone Panzeri , Eleonora Arnone , Michelle Carey , Laura M. Sangalli
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引用次数: 0

摘要

在这项工作中,我们考虑了时空点过程,并研究了它们的连续时空演变。我们提出了一种创新的非参数方法来估算点模式的未知时空密度,或者等同于估算不均匀时空泊松点过程的强度。所提出的方法将最大似然估计与基于微分算子的粗糙度惩罚相结合,微分算子定义在感兴趣的空间和时间域上。我们首先确定了所考虑的估计器的一些重要理论特性,包括其一致性。然后,我们利用先进的数值和计算技术,开发出一种高效灵活的估算程序。由于采用了基于空间有限元和时间 B-样条的离散化方法,所提出的方法可以有效捕捉复杂的多模式和强各向异性的时空点模式;此外,由于地理条件的限制,这些点模式可能会在具有非三维几何形状的平面或曲面域上观测到,例如具有复杂海岸线的沿海地区或具有复杂地形的曲面区域。除了提供估计值,该方法的功能还包括引入适当的不确定性量化工具。我们通过模拟研究和实际数据应用,对所提出的方法进行了全面验证。所获得的结果凸显了与最先进的竞争方法相比的显著优势。
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A nonparametric penalized likelihood approach to density estimation of space–time point patterns

In this work, we consider space–time point processes and study their continuous space–time evolution. We propose an innovative nonparametric methodology to estimate the unknown space–time density of the point pattern, or, equivalently, to estimate the intensity of an inhomogeneous space–time Poisson point process. The presented approach combines maximum likelihood estimation with roughness penalties, based on differential operators, defined over the spatial and temporal domains of interest. We first establish some important theoretical properties of the considered estimator, including its consistency. We then develop an efficient and flexible estimation procedure that leverages advanced numerical and computation techniques. Thanks to a discretization based on finite elements in space and B-splines in time, the proposed method can effectively capture complex multi-modal and strongly anisotropic spatio-temporal point patterns; moreover, these point patterns may be observed over planar or curved domains with non-trivial geometries, due to geographic constraints, such as coastal regions with complicated shorelines, or curved regions with complex orography. In addition to providing estimates, the method’s functionalities also include the introduction of appropriate uncertainty quantification tools. We thoroughly validate the proposed method, by means of simulation studies and applications to real-world data. The obtained results highlight significant advantages over state-of-the-art competing approaches.

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来源期刊
Spatial Statistics
Spatial Statistics GEOSCIENCES, MULTIDISCIPLINARY-MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
CiteScore
4.00
自引率
21.70%
发文量
89
审稿时长
55 days
期刊介绍: Spatial Statistics publishes articles on the theory and application of spatial and spatio-temporal statistics. It favours manuscripts that present theory generated by new applications, or in which new theory is applied to an important practical case. A purely theoretical study will only rarely be accepted. Pure case studies without methodological development are not acceptable for publication. Spatial statistics concerns the quantitative analysis of spatial and spatio-temporal data, including their statistical dependencies, accuracy and uncertainties. Methodology for spatial statistics is typically found in probability theory, stochastic modelling and mathematical statistics as well as in information science. Spatial statistics is used in mapping, assessing spatial data quality, sampling design optimisation, modelling of dependence structures, and drawing of valid inference from a limited set of spatio-temporal data.
期刊最新文献
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